# Why doesn't current pass through a resistance if there is another path without resistance?

Why doesn't current pass through a resistance if there is another path without resistance? How does it know there is resistance on that path?

Some clarification:

1. I understand that some current will flow through the resistance.
2. A depiction of this phenomenon through Ohm's laws does not answer the 'why' part of the question as it does not illuminate the process behind this phenomenon.
3. There seems to be disagreement among the answers on whether the charge repulsions are enough to cause this effect. Cited research would be appreciated to resolve this issue.
4. To refine what I mean by this question, I think I should give an example of why I am curious as to the causal background of this phenomenon. If charge repulsions do in fact repel 'current' in the example of the short circuit, then why does the same phenomenon not happen in other parallel circuits. (Again, I know that not all circuits behave ideally)
5. I believe the question is expressed in the most straightforward way possible. This should, however, not affect the scope of the answers. I do not wish to see or think on the level of an electron as circuit behavior always includes a cumulative effect due to the nature of electrostatic interactions.
• Oct 28, 2018 at 12:40
• Can you explain what you mean by "no resistance?" That's a red flag that suggests you are simplifying things, because everything has resistance (except superconductors in some sense). There's a good chance your confusion is coming from the simplification you used. If we know what you are thinking, we can help better. Oct 30, 2018 at 0:02
• "The question is not well posed because..." - in the context of ideal circuit theory, it is a perfectly valid question. I'm perplexed at the pushback along these lines. Yes, ideal circuit theory is non-physical (thus the ideal part). Indeed, there are no physical circuit elements that obey $v = i R$ or $v = L \frac{di}{dt}$ or $i = C\frac{dv}{dt}$. These are just idealizations that physical circuit elements approximate over some values of $v$ and $i$. So, again, I'm perplexed by the pushback. Nov 1, 2018 at 12:02
• @ChiralAnomaly, the current answers to the question lack supporting information and detail. The "charge buildup" theorem seems to be a point of disagreement among the many answers, while not much information exists on this concept anywhere else. Apr 10, 2021 at 16:18
• @ten1o: adding another answer to this question is a complete waste of time. You don't want it explained by circuit theory, nor do you want an explanation on the electron level. Of course there has to be some charge buildup in order to modify the electric field so as to guide the charges to the observed proportions in the appropriate directions. Otherwise there would only be the vacuum fields between the sources, and the electrons would simply follow them without respect to conductance. Offering a bounty won't coerce any more "pleasant" explanation. Apr 16, 2021 at 15:30

The basic circuit theory "rules" you imply, are high level simplifications applicable at a large scale and at slow speeds.

If you look at it close and fast enough, you could say that a current really starts to go into the obstructed path, but the electric field in front of the obstruction would build up gradually and current will start to repartition into the free path where it can start to flow. Naively you could say that the electric field will "sniff out" the paths. Actually in reality the current will also bounce off the obstructions, reflect and go back and forth etc. This is a real mess in practical electrical engineering at high frequencies.

• @ten1o Because electron density builds up (transiently) in front of the obstructed path, for the same reason that car density builds up in front of a bottleneck on a highway. Oct 29, 2018 at 12:59
• perhaps another comparison might be water through pipes of different diameters. Water at too high a pressure can't transition from one pipe-diameter to another effectively because water is incompressible and it backs up. Meanwhile the pipe that isn't getting narrower continues at its normal pressure and flows faster for it. Oct 29, 2018 at 13:22
• @ten1o Yes, this kind of thing will happen for a very short time whenever there's a sufficiently fast change in the current. In DC and low-frequency AC circuits, this only happens when the current or voltage source is suddenly turned on, and since we're only interested in the behavior of the system on longer timescales, we tend to ignore these transient effects. For high-frequency AC current, though, these transients are important, as they happen on the same timescale as the oscillations in the current. Oct 29, 2018 at 13:51
• @ten1o, would you please clarify for the community if the context of your questions is steady state or transient? Oct 29, 2018 at 15:39
• At high frequency it's customary to use impedance matched connections and constant-width (and impedance) tracks, because those reflections and current loops occur when there is a change in impedance in the path of a conductor. This is why you will see very high frequency circuits having round tracks (no corners) with weird layouts, and unnecessarily long tracks. They are designed that way so that two differential signals will have the same track length and the exact same impedance, to limit reflections, noise and radiation/interference. Oct 31, 2018 at 7:21

I'll try to offer a simpler analogy of how that works.

Camp A on the side of a mountain is full of hikers. There is another empty campsite B on the other side of the mountain. And there are two possible paths between A and B - over the mountain or straight through a tunnel.

You order (apply voltage) the hikers (electrons) to go to camp B. While most are still packing, some hikers have their packs ready almost instantly and head out. A few of them go to the path leading to tunnel, a few go towards the mountain pass.

When the next batch is ready to go, once again few will go towards the tunnel and few will choose the mountain way. However, the latter group will get stuck as the previous mountain guys will be seriously slow trying to get up. So a queue will start to form.

When the next batch is ready to go, they will see that there is a queue on one of the paths and will (almost) all choose the easy way where none of the previous hikers got stuck.

Similarly, the electrons don't in some magical way feel that the path will be harder. They are simply stuck between a bunch of previous electrons that have hard time going that way so in the juncture they redirect to the route without the traffic jam.

The main difference between electrons in electrical paths and hikers on hiking paths is that all electrical paths are initially already full of electrons so the next electrons will instantly observe which path has trouble moving forward.

• In the analogy, I believe the hikers are electrons. Do the electrons change their paths according to the electric field created by the crowd of electrons or by their change in potential energy as they enter and exit the resistance? If so, how is an electric field created within a resistor? @BjornW Oct 29, 2018 at 9:37
• Both. "Change in potential energy" and "electric field" are two tools for looking at almost the same thing. Integrate the electric field along the path of particle and you'll get voltage. Multiply voltage by the charge of the particle and that's the change of her potential energy. Oct 29, 2018 at 12:36
• Electric field inside a resistor is created by the electrons stuck there. They repel the following electrons. Oct 29, 2018 at 12:38
• Yes, exactly. Voltage is defined as the difference of potentials. Say you have potential of 15V at one end and 12V at another. Then the voltage between those points is 3V or -3V (depending on which way you look at it). Thus the voltage is obviously the same on any path between the points. Oct 29, 2018 at 14:41
• @coniferous_smellerULPBG-W8ZgjR I don't think that really paints a more understandable picture for the OP. Either you see it as electrons repulsing other electrons, or holes attracting electrons - in reality, both are in play, but looking at just the electrons is sufficient to explain the phenomenon and lines up better with what the OP already thinks is true ("electrons travel through a conductor"). Electrons don't go this way, because there's already too many electrons there - instead, they go the way that doesn't have as many electrons is a fine simplification IMO. Oct 31, 2018 at 10:09

If there is a parallel path without resistance then the voltage across the terminals is zero. If the voltage is zero then, by Ohm’s law, the current through any branch with resistance is also zero.

• I don't think this is the complete explanation OP was looking for. Oct 28, 2018 at 23:38
• @SamSpade but it is a perfect Microsoft Answer. alunthomasevans.blogspot.com/2007/10/old-microsoft-joke.html Oct 29, 2018 at 13:31
• I don’t know what you guys think is insufficient about it. It was a question about circuits answered clearly using the standard laws of circuit theory. The OP gave no indication in the question that an answer in the context of circuit theory was unwanted. The best policy (IMO) is to use the simplest theory available to answer a question unless specifically requested otherwise.
– Dale
Oct 29, 2018 at 21:39
• Actually, I think the phrase "How does it know there is resistance on that path?" strongly implies that OP is looking for something more than just Ohm's law. And anyway, I think the best policy is to try to figure out what the point of the question is, not just follow the letter of the law. Formulating a good question can be just as hard as finding the answer. Oct 30, 2018 at 18:43
• Um, no. I work with zero resistance materials every day, called superconductors. They are definitely realistic. Infinite current is not.
– Dale
Nov 1, 2018 at 3:46

Why doesn't current pass through a resistance if there is another path without resistance?

Stipulate that there are two parallel connected resistors with resistance $$R_1$$ and $$R_2$$ respectively.

Since they are parallel connected, the current $$I$$ into the resistor network divides according to current division:

$$I_1 = I\frac{R_2}{R_1 + R_2}$$

$$I_2 = I\frac{R_1}{R_1 + R_2}$$

Now, let the resistance $$R_2$$ go to zero while holding $$R_1$$ fixed and see that, as $$R_2$$ gets smaller, the current through $$R_1$$ gets smaller and that, when $$R_2 = 0$$

$$I_1 = I \frac{0}{R_1 + 0} = 0$$

$$I_2 = I \frac{R_1}{R_1 + 0} = I$$

• Why doesn't current pass through a resistance if there is another path without resistance!? Your answer explains how to calculate it but it doesn't explain why this is how it works. Granted though, this could be down to different interpretations of what is being asked for with that troublesome word 'why'. :) Oct 28, 2018 at 20:02
• Oct 28, 2018 at 21:21
• This answer assumes a constant overall current $I$! Only then does $I_1$ shrink with shrinking $R_2$. Constant $I$ though implies a declining voltage because, after all, the overall resistance shrinks with shrinking $R_2$. Constant current was never assumed and actually needs a nice lab transformer. (With a constant voltage the current through $R_1$ wouldn't change a bit, obviously. $R_1$ does not care about remote parts of the universe.) Oct 29, 2018 at 16:18
• Oct 29, 2018 at 17:31
• Seeing as there are now two chat rooms made for the comments on this post, I've removed the comments except for (apparently) the first one in each discussion. Oct 29, 2018 at 20:06

Current will flow through all possible paths no matter how high the resistance. The amount of current flowing through any given path will depend upon voltage and resistance. Given two parallel paths, one very high resistance and one very low, most of the current will flow through the low resistance path, but some will still flow through the high resistance path.

Even an electrical "short" will offer some small resistance. As current flows through a "short" there will still be a small voltage across it. So, if a high resistance is shorted and current flows through the short, there will be some small voltage across it, so some small amount of current will still flow through the high resistance.

In practical terms, we consider a short to pass all of the available current, but in truth, it is never all of the current; small, perhaps vanishingly and inconsequentially small amounts of current will still flow though other paths.

Greatly simplified, let's say we have some electrons and two paths: Now we apply electric field to them and they move: The ones in the low resistance path have moved quite a distance, but the ones in the high resistance path didn't manage to move at all. Also a new electron has arrived at the junction and needs to make a decision.

The absence of electrons is a positively charged hole. So now Coulomb force acts on that new electron, and it is more likely to choose a low resistance path. So there will be not enough charge carriers at the beginning of a low resistance path, and too many of them at the beginning of a high resistance path. It will cause charge carriers at the junction to prefer the low resistance path.

• Except that the electron-electron interaction is usually negligible, so this picture might possibly work as an analogy (that eventually breaks down), but is nowhere near a real description of what happens in reality. Oct 30, 2018 at 13:01
• This picture is a simplified analogy of all answers here. Slow electrons "prevent" new ones from entering, while holes behind fast electrons attract new ones. Add some "misdirected" electrons and the interaction increases. Oct 30, 2018 at 15:17
• @coniferous_smellerULPBG-W8ZgjR That's interesting, I would have thought that this is indeed the mechanism. What else if not an "electron backup" would prevent an electron from entering a wire leading to a resistor? The only possible reason is a weaker electrostatic field, and that in turn can only be caused by the other electrons. Oct 30, 2018 at 15:58
• @PeterA.Schneider The E field is basically setup "instantly" compared to the motion of the conductive electrons. The orders of magnitude differ by a factor 2 or so. All of these electrons are going to feel that same E field. If a region has a higher resistance, it means the electrons are going to be scattered more (for several possible reasons) than in a region with a lesser resistance. I do not know enough of solid state physics, but any solid state or condensed matter physicist should be able to set up a corresponding Boltzmann transport equation and explain what's going on, I believe. Oct 31, 2018 at 8:39
• @coniferous_smellerULPBG-W8ZgjR The speed of charge carriers doesn't matter. 1 A is 1 C passing per second, kind of 1 C "entering" and 1 C "leaving". The path with higher current has higher amount of charge entering and leaving by definition of electric current. Oct 31, 2018 at 10:08

I'll give a partial answer because the real answer probably involves heavy math and is beyond my current knowledge. I wish a condensed matter or solid state physicist would take over and either demolish what I write or improve it.

I think most of the answers (not all) are wrong in that they assume that the electron-electron interaction is the responsible to prevent electrons to pass through a more resistive path than a less resistive path. This is wrong because the $$e^--e^-$$ interaction is "usually" negligible, and in any case do not account for the observed phenomena.

Instead I think the answer should come out of setting up a Boltzmann transport equation for the (quasi)electrons, considering the transient period of time. In other words, the density of electrons $$f$$ satisfy an equation of the type $$\frac{df}{d t}=\frac{\partial f}{\partial t} \big|_{\text{scattering}} + \frac{\partial f}{\partial t} \big|_{\text{drift}} + \frac{\partial f}{\partial t} \big|_{\vec E \text{ field}}$$.

$$f$$ depends on the position, time and is satisfied for each state $$\vec k$$. In the transient period of time, $$\frac{df}{dt} \neq 0$$, but after a short time, when the steady-state is reached, it is worth $$0$$.

To solve the equation and give an accurate answer, several assumptions have to be made. The first it to make clear whether we're dealing with a metal or a semiconductor. Then, some assumptions that reduces the range of validity of the analysis, such as making the relaxation time approximation that greatly simplifies the scattering (or collision) term. See the book of Ziman "Principles of the theory of solids", around page 215 for such a treatment.

An important and relevant point to note is that in metals, current is not due to slowly (drift velocity of order of $$1\mathrm{cm}/\mathrm{s}$$) moving electrons (this arises from the now obsolete Drude's model that many, many, many people still take way too seriously and would defend to death). Instead, current is mainly caused by the few electrons that have a speed near Fermi velocity.

So my current unfortunately not rigorous answer is that the electrons are taking all possible path they can, but the electrons responsible for the current (the few ones at speeds roughly equal to the Fermi speed) are getting scattered by impurities, grain boundaries, physical boundaries, phonons (and not so much with other electrons). This yields what we observe as resistance. So it is not that the electrons are avoiding the path with high resistances, it's that they do take it but they get affected in such a way that the resulting current is small. I emphasize once more: these electrons are few, move very fast (Fermi speed, i.e. about $$10^6 \mathrm{m}/\mathrm{s}$$ and for the most part, do not interact significantly with each other. Screening is a thing that many people here have forgotten.

• The solid state physics may explain how resistance in general works; but since resistance of the wire leading to a resitor in a typical circuit is low (as low as the wires leading to other paths from an assumed junction in the circuit), this answer does not explain why electrons are taking a different route at the wire junction. I still think it's basically a capacitor effect of backed-up electrons. All wires are little capacitors (noticable at high frequencies) and can take only so much charge before the resulting electric field annihilates the field created by the potential difference. Nov 1, 2018 at 10:30
• @PeterA.Schneider I think this should come out of the BTE, which describes the electron density everywhere, at the junction included. By analyzing what happens with varying every terms of that equation, one should see the impact on the electron distribution. I am not really convinced that this would still miss why the electrons are taking a particular path or not. I think this should clear things up. Nov 1, 2018 at 11:32

An electric charge will experience a force if an electric field is applied. If it is free to move, it will thus move contributing to a current. This is what the basic idea of 'Electric Currents in Conductors' is and this is apparently known to you. In nature, free charged particles do exist like in upper strata of atmosphere called the ionosphere. However, in atoms and molecules, the negatively charged electrons and the positively charged nuclei are bound to each other and are thus not free to move. Bulk matter is made up of many molecules a gram of water, for example, contains approximately $$10^{22}$$ molecules. These molecules are so closely packed that the electrons are no longer attached to individual nuclei. In some materials the electrons will still be bound, i.e., they will not accelerate even if an electric field is applied. In other materials, notably metals, according to the Drude-Lorentz Electron-sea theory, some electrons are practically free to move within the bulk material.

Resistance to electrical flow is due to the fact that when charge is given to a resistance, it remains stationary. In case of conductor, it is delocalised so it gets displaced and spread evenly on the surface, so note this carefully: in a conductor, charge flows mostly on the surface itself. This requires, undoubtedly some potential difference across the ends of the conductor but very less in magnitude. So, another fundamental rule/observation of universe is that "any dynamical process occurs in the path that requires least energy expense".

The most general and fundamental formula for Joule heating is: $$P=(V_{A}-V_{B})I}$$

where

$$P$$ is the power (energy per unit time) converted from electrical energy to thermal energy,

$$I$$ is the current travelling through the resistor or other element,

$$V_{A}-V_{B}}$$ is the voltage drop across the element.

The explanation of this formula (P=VI) is:

(Energy dissipated per unit time) = (energy dissipated per charge passing through resistor) × (charge passing through resistor per unit time)

When Ohm's law is also applicable, the formula can be written in other equivalent forms: $$P=IV=I^{2}R=V^{2}/R}$$

When current varies, as it does in AC circuits,

$$P(t)=U(t)I(t)}$$

where $$t$$ is time and $$P$$ is the instantaneous power being converted from electrical energy to heat. Far more often, the average power is of more interest than the instantaneous power:

$$P_{avg}=U_{\text{rms}}I_{\text{rms}}=I_{\text{rms}}^{2}R=U_{\text{rms}}^{2}/R}$$

where "avg" denotes average (mean) over one or more cycles, and "rms" denotes root mean square.

These formulas are valid for an ideal resistor, with zero reactance. If the reactance is nonzero, the formulas are modified:$$P_{avg}=U_{\text{rms}}I_{\text{rms}}\cos \phi =I_{\text{rms}}^{2}\operatorname {Re} (Z)=U_{\text{rms}}^{2}\operatorname {Re} (Y^{*})}$$

where $$\phi$$ is the phase difference between current and voltage,$$Re$$ means real part, $$Z$$ is the complex impedance, and Y* is the complex conjugate of the admittance (equal to $$1/Z*$$).

So, this shows how energy inefficient is electric flow through a resistance under an applied potential.

• Please don't use all-caps for emphasis. Use italics by surrounding your content with _ characters instead.
– user191954
Oct 28, 2018 at 16:48

This question has already been well answered, and in particular several of the correct answers referred to what you call "charge buildup" in the comments where you say:

The "charge buildup" theorem seems to be a point of disagreement among the many answers, while not much information exists on this concept anywhere else.

The "charge buildup" answers are correct and there is a lot of information in the literature about this concept. It should be noted that the "charge buildup" is called "surface charges" in the literature.

Perhaps the seminal paper on the topic is Jackson's "Surface charges on circuit wires and resistors play three roles". This paper describes how surface charges act "(1) to maintain the potential around the circuit, (2) to provide the electric field in the space outside the conductors, and (3) to assure the confined flow of current". In particular, your question is most focused on (3) with some overlap with (1).

Essentially, as others have said, at very short times the currents and the fields are not well-described by circuit theory. During that time the fields act to redistribute charges such that there is a non-uniform surface charge density which acts to provide the local forces needed to "steer" the steady-state currents into the patterns described by circuit theory.

Although Jackson's paper is the most famous on the topic, my favorite paper is Mueller's "A semiquantitative treatment of surface charges in DC circuits". That paper provides a method for graphically approximating the surface charge density in a rough semi-quantitative fashion. The graphical procedure helps build intuition for where surface charges will accumulate.

The basic idea is that the equipotential lines are continuous, including at the surface of a conductor, but they can have sharp bends at that surface. The angle of that sharp bend is proportional to the surface charge density. By graphically drawing equipotential lines and looking at how they bend at the surface you can determine the regions where there will be the greatest surface charge density. Specific hints are given for drawing the equipotential lines.

One other important concept mentioned Mueller's paper is the fact that inside a circuit, where you have a meeting of two conductors of different materials, you can get a surface charge. In other words, surface charges can occur inside a circuit where you have contact between the surfaces of two materials.

This specific type of "internal" surface charge is particularly important for your question since it is this type that prevents the charges from flowing through the higher resistance in your question. At the boundary between the highly conductive wire and the resistor there are surface charges which oppose any current flow into the resistor and effectively steer the current around. This is how the current "knows" where to go.

So, focusing on the resistor and specifically on the “interface” charges. Suppose initially that the current is too high (ie the current doesn’t “know” to avoid the resistor branch). This too-high current will lead to a depletion of positive charges from the entrance surface and an accumulation of positive charges at the exit surface. These surface charges will produce a field that opposes the current and reduces it. The charge will continue to accumulate until the current has been reduced to the steady state value.

• Even though this answer is an excellent insight into the charge redistribution in wires, I think charge accumulation is not a cause but the consequence of current being larger in more conductive material. If we start without current and suddenly turn on the electric field, the current will still be larger inside the highly conducting part. Charge redistribution will just ensure that current is confined within the conductor (i.e. it will fulfill the role (3) you mentioned). Apr 17, 2021 at 1:32
• Sorry @PavloB, part of the reason that I wrote this answer is that I disagree with yours. I think this is a better approach and it is in line with Jackson. I don’t want to get into an argument in comments, we simply disagree.
– Dale
Apr 17, 2021 at 20:37
• I read Jackson and I think I agree with you now, but not because of his work, which did not address causality but just described the chain of events. The example that convinced me was more trivial. Imagine a resistor connected to a battery with a non-zero internal resistance. If we connect another resistor in parallel to the first one, the current through the first one will drop, which can happen only though the redistribution of charge in the network. Significant redistribution though happens only if the battery has internal resistance Apr 17, 2021 at 21:47
• @Dale I know it's un-related but can you just tell me in a simple Yes or No that : electric field inside a conducting connecting wire is zero?
– user326901
Jul 23 at 19:08

"Current flows through a path with no resistance" or "current flows through the path with least resistance" is a common misconception in electronics. In reality current flows though all paths, and the current in each path is proportional to that path's conductance.

If you apply a voltage V to a resistance R, the current I=V/R will flow through it, regardless of other available paths. In reality, you will have a hard time providing a path with strictly no resistance, or applying any significant voltage across a path those resistance is very low. In the end however, you will end up applying some voltage, at which point the Ohm's law will define the current in each path.

• This is the proper answer. The question is most likey based on a misonception which is best dealt with by carefully laying out and systematically applying the basic principles. Nov 1, 2018 at 11:10

Okay, so we know that if a voltage is applied over a resistor with resistance R, then V/R amps with pass through the resistor. The problem is, what happens when R is zero? We have infinite current?

for the purposes of this example, assume that, when I say short circuit I mean "extrmely low resistance path." When I say infinite currrent, I mean extremely high current, and when I say no current, I mean basically no current.

Basically, yes. In a perfect world, if you shorted out a resistor that was connected to a perfect power supply, nothing would happen. The voltage across the perfect power supply (and therefore the resistor) would be unchanged, and a truly ludicrous amount of current would flow through the short circuit, while a normal amount of current would flow through the resistor. However, we do not live in a perfect world, and any real power supply will have a limited amount of current.

As the power supply loses its ability to supply the current the system is demanding (infinite), the voltage across the resistor will no longer be constant and will decrease to ~0. Since the voltage has dropped to zero, no current will pass through the resistor.

To put this another way, perhaps more clearly, there is no arbitrary rule that says a shorted resistor cannot have current pass through it, but the voltage across a resistor is proportional to the current, and the voltage across a short circuit is defined to be zero. Trying to apply a voltage to a short circuit will do nothing, it will simply short out whatever it touches.

• I wonder if such a situation could actually happen in practice in a superconductor circuit (at least to the limit of what current that superconductor can take); there might be extremely high currents on the "short-circuit" without damaging either the wire or the power supply, but then again, the short-circuit could have literally zero resistance (until the current rises too high). But I suppose there's little point in applying usual circuit logic ("everything has some resistance") to a superconductor :P Oct 31, 2018 at 10:17

Let's assume that the resistor and the wire around the resistor are part of a circuit with a battery and a switch.

Before the switch is closed, all battery voltage drops on the switch and all electric field is concentrated between the terminals of the switch, i.e., there is no electric field anywhere else in the circuit. The field across the switch is created by opposite charges on the switch terminals, which represent a small capacitor.

So, when the switch is closed, the initial voltage across the resistor is zero. As the the capacitance of the closed switch is discharged, the voltage and electric field across the switch decrease, while the voltage and electric field across the rest of the circuit increase, causing the current to flow.

Given a uniform initial field distribution, the current will flow faster where the resistance is smaller and slower where the resistance is greater. As a result, there will be a build-ups of opposite charges around the sections of the circuit with high resistance. This build-ups will cause redistribution of the initially uniform field, so that the field is concentrated in the sections with higher resistance, which will speed up the current through those sections, equalizing it with the current through the sections with low resistance.

Since the resistor in question has the low resistance path around it, there won't be any significant charge build-up and no significant field or voltage across the resistor, so the current through the resistor, according the Ohm's law, will be small in comparison with the current through the wire around it.

In summary, the current does not flow through the resistor with an alternative low resistance path, because there is no voltage across the resistor to push it through.

The present statement of the OP's question(s) is (are):

Why doesn't current pass through a resistance if there is another path without resistance? How does it know there is resistance on that path?

The short answers are:

• Why: Current DOES flow through a resistance EVEN IF there is a path of lower resistance present, albeit this current may be miniscule compared to the main current. Nearly all materials at room temperature have a finite resistance hence will allow some charge to flow whenever an external voltage is applied across that material.
• How: The very same mechanism that allows more current to flow through a lower resistance. In terms appropriate for electrical circuits, that would be Ohm's Law

$$V=I R$$

where

\begin{align} V & = \text{the applied voltage} \\ I & = \text{the current through the material} \\ R & = \text{the resistance of that material to the flow of current} \\ \end{align}

the derivation/justification of which I would consider beyond the scope of the current question. We simply note that nearly all materials exhibit this linear response to an applied voltage.

A simple circuit will suffice to illustrate these points. Consider the circuit consisting of three resisters wired in parallel: Conservation of charge says that the current that leaves the battery's positive terminal, $$i_a$$, must return to the battery's negative terminal. This current will be split into three different paths through the circuit (due to the physical construction of the circuit); some of it must go through resistor $$R_1$$ (labeled as $$i_1$$), some through resister $$R_2$$ (labeled as $$i_2$$), and some through resistor $$R_3$$ (labeled as $$i_3$$). Once again, conservation of charge mandates that what flows into a node ($$i_a$$ from the battery) must equal the sum of current flows leaving that node (sum of $$i_1$$, $$i_2$$ and $$i_3$$):

$$i_a=i_1+i_2+i_3$$

Solving Ohm's Law for the current through each resistor we find

\begin{align} i_1 & = \frac{V}{R_1} \\ i_2 & = \frac{V}{R_2} \\ i_3 & = \frac{V}{R_3} \\ \end{align} so that $$i_a = V \Big(\frac{1}{R_1} + \frac{1}{R_2} + \frac{1}{R_3} \Big)$$ where we have used the fact the battery voltage $$V$$ is applied to each resistor. Remember that $$i_a$$ is the total current provided by the battery, hence a single, equivalent resister of value $$R_e$$ would draw the same current from the battery if its value was given by $$R_e = \frac{V}{i_a}$$ Combining these last two expressions we find $$\frac1{R_e} = \frac1{R_1} + \frac1{R_2} + \frac1{R_3}$$ which is nothing more that the classic solution for the equivalent resistance of resistors connected in parallel.

To demonstrate how this result applies to the present question, let's assign some values to the battery voltage and resistors. Let

\begin{align} V &= 1 \text{ volt} \\ R_1 &= 1 \, \Omega \\ R_2 &= 1 \times 10^3 \, \Omega \\ R_3 &= 1 \times 10^6 \, \Omega \\ \end{align}

With these values we find the equivalent resistance to be

$$R_e = \Big( \frac11 + \frac1{1000} + \frac1{1000000} \Big)^{-1} = 1.001001^{-1} = 0.999000 \; \Omega$$

so that the current supplied by the battery is

$$i_a = \frac{1\;\text{Volt}}{0.999000\;\Omega} = 1.001001 \; \text{Amp}$$

The circuit then routes this current through the three resisters as follows:

\begin{align} i_1 &= \frac{V}{R_1} = \frac{1\;\text{Volt}}{1\;\Omega} = 1 \; \text{Amp} \\ i_2 &= \frac{V}{R_2} = \frac{1\;\text{Volt}}{1000\;\Omega} = 0.001 \; \text{Amp} \\ i_3 &= \frac{V}{R_3} = \frac{1\;\text{Volt}}{1000000\;\Omega} = 0.000001 \; \text{Amp} \\ \end{align}

Note that these three currents sum up to the current supplied by the battery:

$$i_1 + i_2 + i_3 = 1 \; \text{Amp} + 0.001\; \text{Amp} + 0.000001\; \text{Amp} = i_c = 1.001001\; \text{Amp}$$

We see immediately that not all of the current followed the path of least resistance as $$i_2$$ and $$i_3$$ are not zero! The current simply followed every path that was possible.

Stated again another way, the current does not choose to take any particular path, it simply takes every possible path, period.

Charge build-up is not needed for the explanation of the phenomenon. The easiest way to understand why current "chooses" the path of least resistance is to stop thinking of current "choosing" anything, and think rather about electric field as a cause of all currents.

Two wires, connected in parallel to each other, have the same voltages drop. Assuming for simplicity the wires are of the same length and cross-section, same voltages imply same electric fields inside the wires. Same electric field causes more current in the low-resistance wire and since currents from both wires add up, most of the current will be coming from the wire with the least resistance.

$$\textbf{PS}$$. The language of "current choosing the path of least resistance" comes from the view of physics through Lagrangian formalism. The phrase is similar to "light chooses the shortest optical path" or "objects choose the least action path". One can demonstrate that if the total current through a system of resistors is fixed, the current distributes in a way to minimize the total power (sum of $$P=I^2 R$$) generated in the network. And since power is proportional to resistance, the current will "prefer" to go through the least resistance.

Let's suppose that a single battery is connected with a wire, which does not have resistance. Electrons will start to flow , in reality, with a wire with resistance, a potential difference would be generated across it. The current would build up until the potential difference is equal to the voltage of the battery. In the case in which potential difference is not created by the wire because there is no resistivity, the potential difference across will immediately become equal to that of the battery.

Basically electrons pass slowly through a resistor so it causes an accumulation of electrons in the resistor which then repel further electrons redirecting them into the other resistance free path.

The question is a bit misleading because it assumes that there is a « all or nothing » answer.

The correct question is:

« If you have two resistances in parallel, with values R1 and R2, what relative fraction of the the current will flow through R1 and R2, respectively? »

The answer is :

I2 / I1 = R1 / R2

So, basically, if R2 is a lot smaller than R1, if will drain most of the current away from R1 when a potential V is applied to R1 and R2 (but not all of it).

I think conceiving of it as the current choosing to flow along the path of lesser resistance rather than the path of greater resistance is a misleading & complicating way of conceiving of it. If a resistor of such & such a value is placed across a source of EMF a certain current given by V/R will flow. If a different resistor is placed across the EMF, a different current will flow. If both the resistors are placed across the EMF simultaneously, then each resistor will simply conduct the current it would have done had the other been absent.

This argument assumes a perfect EMF source for simplicity; but it doesn't matter, because the effect of the being real rather than theoretically perfect of the EMF source is that the voltage across the resistors will fall slightly; but the situation is exactly the same as were you simply considering a perfect EMF source at the new lower voltage.

If the total resistance loading the real EMF source is very much less than it's internal resistance, to the degree that the source is supplying very nearly its closed-circuit current, then the voltage across the parallel load resistors will be a tiny fraction of the source's open-circuit voltage; but it's still the same as were you considering a perfect EMF source at _that _ tiny voltage: each resistor has the current flowing through it that it would have were it alone, at that voltage.

• What happens when the EMF can't supply enough current to get a full voltage drop on each resistor?
– JMac
Oct 29, 2018 at 11:01
• This answer ignores superconductors which are a reality nowadays. The 1st paragraph is wrong because it does not apply to superconductors. Oct 30, 2018 at 13:06
• I believe this is the correct answer to the main question. The current is just a function of resistance and potential difference and does not change due to other paths in the circuit. (If the current through other paths, e.g. short circuits, overloads the voltage source then the voltage drops which is the single reason for the current through our original resisitor to drop as well.) Constant voltage + constant resistance -> constant current. Oct 30, 2018 at 16:03
• The second question is vague ("how does the current know..."). One may understand it as asking for the mechanism of electric resistance, but it is completely unrelated to the misconception underlying the first question. The misconception is the assumption "current [doesn't] pass through a resistance if there is another path without resistance": It does continue to pass, completely unfazed by other paths (unless you take the voltage away)! Oct 30, 2018 at 16:07

Current will flow through all feasible wires, regardless of the resistance's status, so it will never stop. The amount of current flowing through will depend upon voltage and resistance. Given two parallel paths, one containing very high resistance and one very low, most of the current will flow through the low resistance path, but some will still flow through the high resistance path, regardless.

Always remember, little or small doesn't mean none at all. Even an electrically short resistance wire will offer a miniscule amount of resistance. As current flows through a shortage there will still be a small voltage across it. So, if a high resistance is shorted and current flows through the short, there will be some small voltage across it, so some small amount of current will still flow through the high resistance.

In short, we consider a short resistance wire to pass all of the available current, but in truth, it is not all of the current; small amounts of current will still come out via other paths.